Dense Packings of Superdisks and the Role of Symmetry

TL;DR

This paper constructs the densest known two-dimensional packings of superdisks, revealing how shape and symmetry influence packing density and providing evidence for Minkowski's conjecture.

Contribution

It introduces new dense packing constructions for superdisks, including concave shapes, and links symmetry breaking to packing efficiency.

Findings

Packing density increases as shape deviates from circular

Maximal densities achieved by specific Bravais lattice packings

Evidence supporting Minkowski's conjecture

Abstract

We construct the densest known two-dimensional packings of superdisks in the plane whose shapes are defined by |x^(2p) + y^(2p)| <= 1, which contains both convex-shaped particles (p > 0.5, with the circular-disk case p = 1) and concave-shaped particles (0 < p < 0.5). The packings of the convex cases with p 1 generated by a recently developed event-driven molecular dynamics (MD) simulation algorithm [Donev, Torquato and Stillinger, J. Comput. Phys. 202 (2005) 737] suggest exact constructions of the densest known packings. We find that the packing density (covering fraction of the particles) increases dramatically as the particle shape moves away from the "circular-disk" point (p = 1). In particular, we find that the maximal packing densities of superdisks for certain p 6 = 1 are achieved by one of the two families of Bravais lattice packings, which provides additional numerical evidence for Minkowski's conjecture concerning the critical determinant of the region occupied by a superdisk. Moreover, our analysis on the generated packings reveals that the broken rotational symmetry of superdisks influences the packing characteristics in a non-trivial way. We also propose an analytical method to construct dense packings of concave superdisks based on our observations of the structural properties of packings of convex superdisks.